[MATH 2ZZ3] - Final Exam Guide - Comprehensive Notes for the exam (128 pages long!)

3 x y z x y z k zk. Notation: u = u form a basis for. Symmetric: u v v u k u v k u v k u v. 0 u 0 u u u v w u w v w. 1 f and assume they are piecewise continuous on some interval [a, b]. Notation: ( x x d x f f. 1 f inner product a f on the interval [a, b] is the number: We now need to check to see that each of the four properties holds. f. This holds because you can take out constants from integrals. ( ) 0 f x = is our zero . Take the inner product of itself. x x x x x x x. 3 b a b a b a d f f x. We look at functions as if they were vectors with the dot product applied to them.